Decorated Corelations

Abstract

Let C be a category with finite colimits, and let ( E, M) be a factorisation system on C with M stable under pushouts. Writing C; Mop for the symmetric monoidal category with morphisms cospans of the form c m←, where c ∈ C and m ∈ M, we give method for constructing a category from a symmetric lax monoidal functor F ( C; Mop,+) (Set,×). A morphism in this category, termed a decorated corelation, comprises (i) a cospan X N ← Y in C such that the canonical copairing X+Y N lies in E, together with (ii) an element of FN. Functors between decorated corelation categories can be constructed from natural transformations between the decorating functors F. This provides a general method for constructing hypergraph categories---symmetric monoidal categories in which each object is a special commutative Frobenius monoid in a coherent way---and their functors. Such categories are useful for modelling network languages, for example circuit diagrams, and such functors their semantics.